Tax structure inflation and unemployment
by Thomas Cool
Rotterdamsestraat 69, 2586 GH Scheveningen
The Netherlands
December 15 1993, revised March 16 1994, slightly May 20 1994
Summary
Last decades show internationally a worsening 'trade-off' between inflation and unemployment,
which phenomenon is called stagflation. A possible cause is the structure of taxes and premiums
that OECD nations have in common. This common structure has a dynamic component: a tendency
of reduction of both exemption and statutory marginal rates. The economic theory behind this policy
and structure uses comparative statics and partial derivatives. The alternative dynamic analysis
uses total derivatives, and thus takes account of tax parameter changes. In dynamics, the marginal
rate relevant for incentives is close to the average tax rate. What is wrong about current policies, is
that exemption is indexed on inflation while subsistence rises with inflation and real income. This
causes either poverty or rising minimum wages, thus benefits, taxes, and lower incentives. If exemp-
tion was put at subsistence, then jobs could be created at the low end of the labour market, which
saves benefits and reduces average taxes, which increases incentives. If low productivity labour
has a stronger position in the labour market, then the risk of unemployment is spread more evenly,
and trend-setting high productivity labour will be cautious about wage claims. Since the present
situation is inefficient, an improvement is possible from which everybody can benefit (Pareto improv-
ing).
Keywords: inflation, levies, Phillipscurve, stagflation, taxes, unemployment
PM 1. Since 2004 Colignatus is the preferred author name in science. See http://www.thomas-
cool.eu/
PM 2. This is a PDF generated in Mathematica 9.0 in January 2013. The paper was published by
Guido den Broeder of http://www.magnanamu.nl 1994, ISBN 90-5518-208-7, and included in the
archive EconWPA at St. Louis ewp-mac/9508002. It has been on the web also in html, at
http://www.thomascool.eu/Solunemp/html1993/Solunemp.html
IntroductionThe last decades show internationally a worsening 'trade-off' between inflation and unemployment,
which phenomenon is called stagflation. A possible cause is the tax and premium structure that
OECD nations have in common. In the following, we firstly introduce taxes and stagflation, secondly
relate to the existing literature, and then discuss what we shall do.
Levies
Premiums will be taken as part of taxes. To emphasize the general character of the analysis, the
body of the text below will use the word "levy". In the literature, premiums for old age, sickness,
disability, unemployment and the like are often regarded as insurances, and studied separately.
Here they are all lumped together with taxes proper, and studied in their relation to stagflation.
Most developed nations have nonproportional levies, i.e. with an exemption at the threshold and
then a (rising) statutory marginal rate. Policy has been remarkedly similar across nations too. It has
two distinct features, see OECD (1986) and for example The Economist (1993):
The policy feature concerning the slope, or the statutory marginal rate.Both in theory and public discussion there is a consideration that high marginal rates have disincentive effects. This has resulted in the policy objective to reduce marginal rates. One way to reduce marginal rates has been the switch from income tax to VAT.
The policy feature concerning the intercept, or exemption. Tax parameters, and notably exemption, are generally indexed on inflation. Since incomes tend to grow faster than inflation, exemption lags behind incomes. There is a deliberate tax creep - measured by the 'macroeconomic progression factor'.
These two features have complemented each other by the policy requirement of budget neutrality.
Budget neutrality requires that the revenue loss due to slope reduction is compensated. This rev-
enue will often come from the tax creep and the reduction of exemption.
Stagflation
These levy policies have been developed partly to do something against stagflation. Stagflation is
the phenomenon of a worsened 'trade-off' between inflation and unemployment. The phenomenon
can be described in terms of the Non-Accelerating-Inflation Rate of Unemployment (NAIRU). With a
constant NAIRU there can be stable inflation at stable unemployment. With a changing NAIRU
there are important changes in the trade-off. The relationship is depicted in figure 1. Note that the
axes have double meanings. Case (a) gives the situation somewhat like the 1950s. The trade-off of
inflation and unemployment then took place at low rates along the long drawn line. The trade-off of
price acceleration and unemployment gives the short line, and the intersection gives the NAIRU. At
that point price acceleration is zero, or inflation remains at a stable value. Case (b) gives the situa-
tion of stagflation, where both the NAIRU and the trade-off-process around it have worsened. The
move from (a) to (b) can be called 'stagflationary'. In the 1960s and 1970s authorities targetted for
low unemployment at the cost of rising and eventually high inflation. In the 1980s authorities target-
ted against inflation and accepted high unemployment.
2 SOLUNEMP.nb
Levies come into the argument into the following manner. (1) Levies divert income and thus affect
aggregate demand, especially when levies go to benefits and consumption instead of saving and
investments. (2) Levies reduce net wages, and thus are thought to affect the supply of labour.
Statutory marginal rates are thought to have disincentive effects. (3) Levies are thought to cause
forward shifting, i.e. that levies are shifted into wage costs. These issues will be discussed below.
5 10 15 20 & NAIRU
unemployment
percentage
(a) like in the 1950s, (b) stagflation
Fig. 1: Phillipscurve relation between unemployment and inflation
-10
-5
5
10
15
20
& acceleration
inflation
percentage
(a)
(b)
SOLUNEMP.nb 3
Literature
The following references put the argument into perspective. Bruno & Sachs (1985) give a standard
reference for stagflation. Their formal analysis uses homogeneous labour and proportional levies,
though some of their statements allow for an interpretation of heterogeneity and nonproportionality.
The need for modelling heterogeneous labour and nonproportional taxation is clearly recognized in
the literature, see e.g. Beenstock et al. (1987) and Minford & Ashton (1993). Layard, Nickell &
Jackman (1991), another standard, allow for heterogeneous labour, yet tend towards proportionality
in levies. In addition, these references use dynamics but do not explicitly discuss the consequences
of changes in levy parameters. Auerbach & Kotlikoff (1987) give a wealth of information on fiscal
dynamics but do not specifically tackle stagflation. Other references which put the Phillipscurve in
perspective are Okun (1981), Blanchard & Fischer (1989) and Friedman (1991). Very recent are
The Economist (1994) and Phelps (1994). Extensive theoretical and empirical work has been done
by the Centraal Planbureau (1992a&b), Gelauff (1992) and Cool (1992).
This paper extends the argument in Cool (1992), combining CPB internal notes Cool (1990) and
Cool (1991). Highlighting only the main dynamic mechanism, this analysis remains embedded in full-
scale empirical analysis and national economy modelling, so that other mechanisms are taken into
account in the background.
What we shall do
In the following we will first develop the levy and stagflation concepts in more detail. Then we
discuss the differential effects of exemption and marginal rates, using dynamics instead of compara-
tive statics. A crucial topic is crowding out on the labour market. High productivity labour can
replace low productivity labour more easily than conversely, and this has effect on inflationary wage
claims. (This results into something like a continuous version of the insider-outsider theory.) We
also discuss the issue whether stagflation is inefficient. If it is inefficient, then there is a Pareto
improving alternative.
The paper concludes that current policies have not countered stagflation but have actually
increased it. Current policies add to labour costs, reduce incentives, fuel forward shifting, and
worsen the 'trade-off' between inflation and unemployment. The disincentive effect of levies
depends less on the statutory marginal rate and more on the average levy over time (which average
includes statutory rate changes). In addition, the lowering of exemption means either poverty or
rising labour costs in the lower wage brackets, causing unemployment, and causing higher levies to
pay for the benefits. If a welfare state is defined as a state that provides benefits for the lowly
productive anyway, then it is run more efficiently by using the resources going into benefits to
instead reduce labour costs and to price the lowly productive into jobs. This paper develops the
argument that such a policy is dynamically sound too.
In the discussion we use a nonlinear and flexible levy function with three parameters. The use of
this function allows us to give concrete examples. However, the basic results are independent of
functional form.
4 SOLUNEMP.nb
Levy concepts
We abstract from different levy groups and deductions. Individual levy l[y] has base y, called gross
income. National levy is L and its base Y, and these two give the national levy burden quote L / Y.
Gross income is related to productivity via nonwage costs and the profit rate. We abstract from
other nonwage costs and also assume the equalization of profit rates, so that y may also be seen as
an indicator of individual productivity. Appendix A contains a more detailed statement of those
relations.
Most nations use nonlinear levies. The use of linear approximations, also in the design of new levy
schemes, thus is not advisable. Appendix B, section 2, gives an example how a linear alternative
fails to satisfy reasonable assumptions. Hence we have to find a neat nonlinear form.
A useful nonlinear levy function is:
(1) l[y] = r (y - x) y / (c + y) (y > x)
with y the levy base, r the marginal rate in the limit when y goes to infinity, x the exemption or
threshold, and c a curvature parameter. The ordered set of parameters is q = (r, x, c).
The average levy is:
(2) l[y] / y = r . (y - x) / (c + y)
The statutory marginal rate is not too simple. At y = x it starts with the value r x / (c + x) and in the
limit of y it equals r:
c (c + x)(3) ðl/ðy = r (1 - ---------) -------- 2 (c + y)
Note that the levy on the marginal dollar can always be approximated by l[y+1] - l[y].
Function (1) can be transformed into:
(4) l[y] = r.y - r.x - c.l[y] / y = a1.y + a2 + a3.(l[y] / y)
and, if one neglects the error in the l[y]/y quotient on the right, then it can be estimated by ordinary
least squares.
SOLUNEMP.nb 5
Cool (1992) estimated (4), using macro tax data of the Netherlands only, with a reasonable fit. This
result is reproduced below, in US dollars. The equation can be plotted for two ranges, (H1) for a low
income range till $25000 to show the curvature, and (H2) for a wider income range till $250000 to
show the straightness in the limit. See Figure 2, where one gets the wider range by multiplying the
axes by 10. The 45-degree line has been added to allow visualisation of net income. Since the
Dutch case has a high marginal rate in the limit of 57.2 %, we add US-alike lines U1 and U2 with a
40 % limit. The relevant equations are:
H1[y] = Holland[y] = .572 (y - 2674) y / (17554 + y)
U1[y] = USalike[y] = .400 (y - 2674) y / (17554 + y)
H2[y] = H1[ 10 y ] / 10 (Holland, ten times the axes)
U2[y] = U1[ 10 y ] / 10 (US-alike, ten times the axes)
5000 10000 15000 20000 25000y income
(1) actual axes, (2) ten times the axes
(H) Holland, (U) US-alike,
Fig. 2: Different tax regimes
5000
10000
15000
20000
25000
levy
(U1)
(U2)
(H1)
(H2)
6 SOLUNEMP.nb
Stagflation concepts"Stagflation" is a concatenation of "stagnation" and "inflation". The word was coined around 1975
when national income growth stagnated and brought along unemployment. Since then GNP growth
has somewhat recovered, and stagflation has been redefined and now is properly understood as a
bad 'trade-off' of both inflation and unemployment.
To discuss stagflation, we will use the expedient of opposing three Views. These will be denoted as
the Simple, the Complex and This Paper's Views.
The Simple View uses comparative statics with homogeneous and flexible labour supply and
demand schedules. Every economist can dream the Marshallian Scissors of supply and demand, so
it is not necessary to reproduce a graph. In this View, the orginal equilibrium will be reached at
wage w* and employment E*. An income tax causes workers to demand a higher wage, and the
supply schedule shifts upward. A payroll tax for employers causes a lower offer wage, and the
demand schedule shifts downward. A new equilibrium with E' < E* finds employers paying gross w'
> w* and workers receiving net w" < w*. With supply and demand schedules derived with marginal
analysis of utility and profits, the underlying assumptions cause an important role for statutory
marginal tax rates. First best here are lump sum taxes and zero marginal rates.
The Complex View is empirical and thus inherently dynamic. Empirical research, see e.g. Ashenfel-
ter & Layard (1986), Hum & Simpson (1991) and Gelauff (1992) shows that marginal rates have
surprisingly low elasticities. By consequence the average wedge is important, see Den Broeder
(1989). Recently Minford & Ashton (1993) see scope for a larger effect, but, their study is still far
from explaining stagflation, partly for the reason that it is not fully dynamic.
The reason for a lesser importance of marginal rates is that labour supply is not flexible, but rather
fixed. People are still very much like Marx's proletariat. People have little else to fall back on but to
supply their labour. There is some choice for partners and for people on benefits, but this does not
have a major impact. By consequence, the major equilibrating forces exert themselves on the wage
and the related employment. Here arises the dynamic situation of (wage) inflation and unemploy-
ment, and thus the issue of the Phillipscurve.
In the existing literature, e.g. Gelauff (1992), the statutory marginal rate actually increases employ-
ment, instead of reducing it as the Simple View would hold. A higher rate (under constant average)
reduces earnings at the margin, penalizes and lowers wage demands, reduces (wage) inflation and
thus increases employment. Similarly, a higher average rate (under constant marginal) causes
compensating and useful wage demands at the margin, and reduces employment. These properties
are consistent with analyses concerning a Tax-based Income Policy (TIP).
The OECD policies referred to in the introduction, directed at lowering statutory marginal rates,
have been advocated using the rhetoric of the Simple View. In so far they have been successful in
practice, it is because they have also lowered average rates. The reduction of marginal rates
actually had a negative impact. Higher budget deficits have been relied on to pay for additional
benefits and average rate reductions for higher incomes. Unfortunately, the empirical data over the
1980s now show the combination of a reduction of taxes on higher incomes and some reduction of
unemployment, and thus seem to corroborate the Simple View. It will be difficult for policy makers to
include more variables and accept the Complex View.
The Simple View makes the category mistake, of using arguments concerning the income distribu-
tion for issues of growth and employment. The Complex View already gives a correction. This
Paper's View will extend on that. The major decision facing a person concerns the choice of his
position within the income distribution. Under balanced growth, that distribution shifts evenly
through time. Then the statutory marginal rates have other effects than the Complex View yet
allows, and the average rate is even more important.
SOLUNEMP.nb 7
Phillipscurve conceptsThe Phillipscurve reflects the hypothesis that inflation is influenced by unemployment. Of course
other factors are important too, such as price expectations and forward shifting of levies. Whatever
other influences on prices, the key notion of the Phillipscurve remains the influence of the employ-
ment situation. Vacancies will strengthen the position of employees and their unions, unemploy-
ment wil weaken it. Here, for simplicity, we take the general price level instead of wage inflation.
Let P be the price level so that dLog[P] is inflation. Let dLog[P*] be inflation required to achieve
equilibrium, U the rate of unemployment, Us a shift variable, V the rate of vacancies, L/Y the levy
burden, all at the macro level. Let H be a summary statistic of the history of these variables.
The inflationary process consists of the process along a curve and the shift of the curve, as already
discussed in relation to figure 1. The following is a choice about what variable is important for what
movement:
(5) dLog[P] = dLog[P*] - a Log[U - Us + z] (a >= 0)
(6) Us = Us[V, L/Y, H]
The Equilibrium Rate of Unemployment ERU arises when dLog[P] = dLog[P*]. It is not empirically
warranted that an ERU exists. When it does:
(7) 0 = - a Log[ERU - Us + z]
(8) a > 0 => ERU = Us - z + 1
When dLog[P] = dLog[P*], then it is still possible that inflation dLog[P] is rather erratic, and possibly
even accelerating. Unemployment might constrain acceleration too, which gives the Non-Accelerat-
ing-Inflation Rate of Unemployment (NAIRU). A suitable situation is that ERU = NAIRU.
This sums up a rather standard view of stagflation.
The analysis below concerns the relationship of levies to the shift variables. Forward shifting of the
levy burden L/Y into wages is not discussed and taken for granted. The lack of V in (5) may not be
wholly standard, and will be explained as part of our discussion.
8 SOLUNEMP.nb
Discussion: exemptionThe nonproportional levy clearly becomes important when incomes differ, i.e. labour is heteroge-
neous in terms of productivity, labour costs and income. Lower income earners are affected dispro-
portionally by the exemption level, not merely in terms of the income distribution but also in terms of
their competitive position versus higher earners.
If b is the net subsistence benefit level, then m solves as the implied minimum labour cost:
(9) b = m - l[m]
Alternatively stated, the function g[y] = l[y] + b contains the system parameters on levies and bene-
fits, and m follows as its fixed point m = g[m].
For the l[y] in (1), the solution of m for reasonable parameter values is:
b - c - r x + Sqrt[4bc(1 - r) + (b - c - r x)^2]
(10) m[b] = ------------------------------------------------
2 (1 - r)
The solution of m can be determined graphically. Figure 3 shows this for the lower range (H1) of
figure 2, using the net subsistence benefit of approximately $11000 for the Dutch family. Taking the
intersection of the levy line l[y] and the "benefit line" y - b (parallel to the 45-degrees line), we draw a
vertical line through it, and find m ~ $14000. We add a hypothetical employment/income/productiv-
ity density, and conclude that everybody below m will be unemployed. Working will not earn a
subsistence living, which makes one eligible for benefits. Thus m defines minimum wage unemploy-
ment Um. People in Um are not relevant for the labour market and will not exert a downward pres-
sure on inflation. Hence Um enters Us (here as part of H). This argument is developed in Appendix
A.
The situation of formula (9) and figure 3 is a rather standard minimum wage model. The innovation
in this section comes from looking at the dynamic situation.
Sociobiological and social psychological causes, Aronson (1992a&b), apply. Net subsistence tends
to be indexed on net general income. Sometimes there are legal rules on indexation in this manner.
Often labour unions come in. More generally it is simply a social convention. A certain level of living
is regarded as inacceptable, both by most employers and by the work floor in general. Sometimes
labour market regulators may be aware of the problem of the minimum wage, and may opt for a
lower indexation of m even though it results into a lower b. But the effectiveness of such measures
depends upon the strength of conventions in all factories and sectors.
On the other hand, exemption x is established within the bureaucratic realm where there is no direct
confrontation with the standard of living. For its own historical reasons, exemption is generally
indexed on inflation.
Thus there is a differential indexation. Required gross minimum m rises faster than both net mini-
mum b and the general level of income. In figure 3, when we subtract the inflation component from
x, b and m, differential indexation shows up as m moving to the right. If productivity in the lower
earnings scales doesn't rise faster than general productivity or income, then ever more people grow
unemployed.
In the US the 1948 exemption was $600 a person. In 1990 it was $2050. Had the exemption been
indexed it would have been $7800. See The Economist (1991). Similar figures exist for Holland.
SOLUNEMP.nb 9
5000 10000 15000 20000 25000y income
Fig. 3: The direct impact of exemption on employment
5000
10000
15000
20000
25000
& employment
levy, benefit
(U1)
(H1)
frequency
employment
line
benefit
cutoff
minimum
The relative rise of m is rather obvious. For all clarity we shall prove it, first using the specific levy
function (1), secondly independent of form. First we will show that m grows faster than b, then that
m grows faster than productivity too, causing unemployment.
Let us first discuss the specific example of (1). Let the price level index again be P. With real growth
index G, the nominal index is P G. For a dynamic path we have starting position b[0] giving m[0] =
m[b[0]]. Parameter r will not be indexed. We neglect budget consequences.
First we find:
(11) b = P G b[0] (indexed on general welfare)
(9') b = m - l[m, (r, Px,Pc)] = m . {1 - r . (m - P x) / (c P + m)}
Since m is the solution of (11) and (9'), it implicitly defines index J:
(12) m = P J m[0] i.e. J = m[b] / (P m[0])
10 SOLUNEMP.nb
To prove that J > G, combine (11), (9') and (12), and see that P falls away in the second part:
(13) G b[0] = J m[0] . {1 - r . (m[0] - x/J) / (c/J + m[0]) }
As G and J go to infinity, then G b[0] ~ J m[0] (1 - r). For common parameter values the minimum
level is taxed at a rate less than r, implying that b[0] > (1 - r) m[0]. Then J > G.
Let us secondly look at productivity and employment. When we start with full employment at m[0],
then m[0] provides the equilibrium of supply and demand. Let the supply price (gross income /
productivity) at the minimum be ms[0] and let the demand price (labour costs) at the minimum be
md[0]. Then m[0] = ms[0] = md[0] is a minimum level of productivity at which one can work in the
start situation. Assuming balanced growth for demand and supply gives the development of the
labour market situation at the bottom:
(14) y = P G y[0] in general, for all y (welfare = productivity)
=> md = P G md[0] & ms = P G ms[0]
Equation (14) means that the supplied (inherent) productivity of those at the minimum grows as fast
as the labour costs which employers could afford. It is likely that technology creates so many possi-
bilities, that employers can finance even higher costs. However, the true supply price is not productiv-
ity but gross income m, which grows faster than the md. People in the class [md, m) will not find
jobs paying the social minimum. They become eligible and apply for benefits, and are on this
account unemployed.
It is now obvious that a more general statement is possible. The relevant mathematical theorem has
been formulated by Cool (1992). We do not reproduce that result.
The general character of the analysis, and our use of the general term of "levies", will now be clear.
If some insurance for old age, disability and the like is thought to be part of social subsistence, then
exemption is warranted. A proportional VAT will be important too. It adds to the cost of living and
thus indirectly to higher wages. A rise of VAT or a shift from income tax to VAT causes a shift,
similar to a reduction of exemption. Though a VAT taxes profits too and thus seems to allow a
general reduction of the price of labour, it raises costs disproportionally for the lowly productive.
SOLUNEMP.nb 11
Discussion: the slopeThe section on "stagflation concepts" above clarifies an existing conceptual problem. Statutory
marginal rates are important in popular understanding, but not in the empirical data. Research in
the existing literature deals better with the data, but doesn't convince the popular view. This paper
suggests a solution. Theory, public discussion and empirical research generally use the statutory
rate as the "marginal". This is the partial derivative in (3). However, the levy function is better under-
stood not as l[y] but as the multivariate l[y, q]. Rational agents will take account of parameter
changes. Then the better marginal rate is the - dynamic - total derivative:
(15) dl[y,q]/dy = ðl[y]/ðy + ðl[y]/ðq . dq/dy
Important is the following property. For nonzero values in general, it holds that the dynamic
marginal rate equals the average rate, if and only if there is balanced growth:
(16) marginal = dl[y] / dy = l[y] / y = average <=> dl[y] / l[y] = dy / y = dLog[y]
This can be verified by manipulating numerators and denominators. Under balanced growth, levies
will grow as fast as incomes, with a constant levy share L/Y. This situation would require certain
changes of the levy parameters, see (15).
Function (1) can be used as an example for this general property. For l[y, q] in (1) a solution for a
balanced growth path (with a stable productivity density) is that parameters x and c are indexed on
y. In other words, if the index for y is i = P G, we find for the (individual) average levy burden that
the index value drops from both numerator and denominator:
(2') l[ iy; r, ix, ic] / (iy) = r (iy - ix) / (ic + iy) = l[y; r, x, c] / y (for all i > 0)
The marginal rate in (3) has the same property of remaining the same under growth indexing. This
however is less relevant, since it does not relate to a general property as important as (16).
The situation of a constant dynamic marginal rate is depicted in figure 4 for a doubling of income.
Point A is an arbitrary point on the employment density. We scale the density so that A also lies on
the levy function (H). For that arbitrary income at A we determine the average levy as a ray through
A and the origin. Now, if all incomes double, then the employment frequency density shifts, and A
becomes B. If levy parameters x and c double too, then the levy function becomes (2H). At B the
individual still pays the same average levy in C.
This analysis implies that levy incentives primarily affect decisions about one's place in the income
density. By consequence the policy maker should rather look at investment and the rate of interest
to find the true incentives for growth. This may be clarified.
12 SOLUNEMP.nb
20000 40000 60000 80000 100000 120000y income
AB: constant frequency, ABC: the same average levy
Fig. 4: A balanced growth shift of levy and employment
10000
20000
30000
40000
50000
60000
70000
80000
employment
levy and
(H)
(2H)
frequency 1
employment
frequency 2
employment
A B
C
45 degrees
average
Figure 5 (a&b) contains more information about the individual choice. They compare the trade-offs
between work, income and leisure, both in the present and with a doubling in, say, thirty years. How
the individual is going to react to the doubling of his income (opportunity) depends of course upon
the shape of his utility function. There are price and income effects, which may cause substitution of
income for leisure. What is important, is that we verify that the assumption of balanced growth
implies that the tradeoffs remain similar in terms of gross and net income. For example, if a person
starts working less hours, his income may rise by 80 % instead of 100 %, and if taxes rise by 80 %,
the average tax burden still is constant.
Each tradeoff in fig. 5a consists of a pair of gross and net income, linked by a line (measuring the
levy) at 16 hours of leisure and 8 hours of work. Double net income is in this case larger than gross
income. Figure 5b shows the combinations of average and marginal rates for the two situations.
Since we use levy relation (1) indexed on growth (in this case a doubling of x and c, with constant
r), these tax lines don't change.
For another individual the income opportunity frontiers in fig. 5a will differ, and thus fig. 5b too; but
under this method of indexation the tax lines remain constant too. This indexation can be said to be
"neutral to the income change". The tax choices facing an individual, whose income grows as
national income, are constant. The utility reaction thus depends on the change of income itself.
Since the context is that all individuals are adjusting, this may be reformulated as that individuals
are determining their place within the income distribution.
SOLUNEMP.nb 13
14 16 18 20 22 24leisure hours
Assuming that gross tradeoffs are similar
Fig. 5a: The individual choice between work and leisure
20000
40000
60000
80000
100000
y income
14 16 18 20 22 24leisure hours
Same shapes for average and marginal tax rates
Fig. 5b: The individual choice between work and leisure
0.1
0.2
0.3
0.4
0.5
tax rates
average
marginal
14 SOLUNEMP.nb
Discussion: crowding outUnemployment among the higher skilled is not large. The analysis here is that this is caused by
crowding out on the labour market. When potentially higher productive people face the choice
between unemployment and a comparatively lower paid job, they choose the latter. They thereby
"take the places" of others - who repeat the process to others below. The initial set-back in pay level
tends to translate into wage growth demand. Who crowds out, has a stake in trying for wage
growth. Who have been crowded out towards unemployment, have some incentive not to inflate,
but have little countervaling power against the general mood for inflation.
Figure 6 gives the stylized fact for labour demand (D) and supply (S), that vacancies tend to occur
at higher income brackets and unemployment at lower ones. Demand could be approximated by
next period's employment E, and thus D & S already include some crowding out effect. Though we
do not neglect submarkets, there is a meaningful aggregation of vacancies and unemployment by
bracket, giving Vl, Vh, Ul and Uh. When vacancies are asymmetrically relevant only for the higher
incomes (V ~ Vh, Vl ~ 0), and when there are always vacancies for higher incomes due to crowding
out (Vh >> 0), then V is not that important. This has been formalized here by eliminating V from (5).
Secondly, V may become important again when V1 is made nonzero by proper tax policies. High
values of Vl and Uh have the largest wage checking effect. High Vl and Uh make it difficult for the
trend setting higher productive workers to shift the risk of unemployment to the lesser productive
workers. We will not formally develop this point.
50000 100000 150000 200000 250000y income
Fig. 6: Labour supply (S) and demand (D)
100
200
300
400
manhours
million
S
D
SOLUNEMP.nb 15
Discussion: suboptimalityThis paper's analysis is that an unfortunate choice of levy parameters of has caused the shift of the
Phillipscurve. Since this shift is avoidable and inefficient, the unemployed are idle resources and the
economy produces at suboptimal level. Social welfare could be improved by replacing the current
schedule by another one which allows the reduction of wage costs, creation of employment, saving
of benefits, and less levies.
Searching for that alternative, we pay particular attention to the average levy. The average rate is
not "more important" than the statutory marginal rate. In abstract sense they are both important. But
the average rate gains in attention value due to our dynamic analysis.
One alternative regime is quickly found. A new "levy class", valid for people earning between b and
m, does not cost anything in terms of revenues forgone, since people in that class presently do not
work and thus do not pay levies. A drawback is that this new class creates a so-called 'poverty trap',
a 100 % or more tariff, at m. This need not be regarded as a big problem however, since economic
growth can be used to repair it gradually. However, it remains a challenge to see whether one can
do better.
The most attractive alternative may well be labour cost compensation. This is a negative income
levy for workers (NIL) - and not for others. In figure 3, an alternative levy line can start in the nega-
tive levy area and remain below the drawn existing levy. This new levy favours employment in the
lower wage brackets.
Let the new levy be l*[y] = l[y, q*]:
(17) l*[y] = r* (y - x*) y / (y + c*) (y >= m* >= 0)
The NIL will only be given from some minimal market earnings m*. This can be below subsistence b
since the NIL makes up for the difference. The basic assumption thus is that the levy rates and
minimum wage are co-ordinated:
(18) m* = b + l*[m*] 0 < m* (for example m* < b < m)
There is a subtle difference in the meaning of x in (1) and x* in (17). In (1) x is really exemption, in
(17) x* is just the intersection with the horizontal axis. In the standard stagflationary situation, x is
rather low, and hence x* would be higher. To compensate part of the loss of revenue, one would
reduce the curvature parameter, giving c* < c. Hence x* > x and c* < c.
If the new levy is to be superior, it must be for the dynamic marginal:
(19) l*[y] / y =< l[y] / y
Let the levy reduction be financed by saved benefits. Denote total employment as E. The change of
employment will be a function of m*, say dE[m*]. Each newly employed person saves benefit b and
adds income w = w[m*]. The latter might equal m* but would normally include a general rise of
productivity. Determination of L* as revenue requires a difficult integral, but L* as expenditure is
easy:
16 SOLUNEMP.nb
(20) E* = E + dE[m*]
(21) L* = L - b dE[m*]
(22) Y* = Y + w[m*] dE[m*]
Equations (17) till (22) sum up the new situation and the conditions to be fulfilled. Our deductions
are transferred to Appendix B. The solution strategy is to take m* as the independent variable and
solve for x* and L*/Y*. This gives a general choice set for x* and L*/Y*, for example as depicted in
figure 7. The smaller choice set to the left depicts the perception of policy makers, with both a low
exemption level (x) and a high levy burden. Lowering exemption is thought to cause higher benefit
payments. Raising exemption is thought to cause higher marginal rates, lower incentives and thus
lower national income Y. Alternatively, the enveloping choice set is the true situation according to
the present analysis. It contains the possibility of a lower levy burden at a higher intersection (x' =
x*). Thus a NIL would create employment, reduce average taxes and reduce stagflation.
0 2000 4000 6000 8000 10000& intersection
x exemption
(x) Perceived & exemption, (x') Actual & NIL
Fig. 7: Budget neutral possibilities curves
0.4
0.5
0.6
0.7
0.8
0.9
1
L / Y
x
x'
SOLUNEMP.nb 17
ConclusionStagflation is an international phenomenon, and its likely cause is the structure of taxes and premi-
ums which OECD countries have in common. The common structure (actually a policy) is a ten-
dency of reducing both exemption and statutory marginal rates under budget neutrality.
To analyse and verify this, we clarified three viewpoints and discussed the topics of exemption,
slope, crowding out, and budget optimality.
We have found that the mentioned levy structure is a major cause for stagflation indeed. Current
policies try to reduce marginal rates under budget neutrality, so that the result is lower exemption.
Part of the common structure is that levies are indexed on inflation while incomes and social subsis-
tence rise faster. This implies (1) a disproportional rise of labour costs in the lower wage brackets,
causing poverty or unemployment, (2) a constant average levy with constant disincentive - while to
pay for the benefits often budget deficits are incurred. Thus we have a clear explanation for the
worsening trade-off between unemployment and inflation.
The stagflationary influence can only be traced by taking account of nonproportionality for the levies
and of heterogeneity for labour, while the overall method must be dynamics instead of comparative
statics. Not only levy parameter values within the year are important but also their changes over the
years. This implies the use of total instead of partial derivatives.
By this analysis, the emphasis shifts from marginal rates to average rates.
This is likely more important for public discussion than for the literature. The literature has already
been sensitive to the empirical data which show a different role for marginal rates. Public discussion
however finds these empirical results hard to believe. It is precisely for the fact that popular under-
standing neglects the data and uses a simple model and static analysis, that the common tax
structure has come about and is maintained. Current policies are said to be intended to fight stagfla-
tion, but they actually cause it. Perhaps, then, that the present analysis is more convincing.
It is useful for popular debate that the shift of emphasis to average rates is as clear as possible. The
following is a small example of how a dynamic marginal rate can equal a normal average. Let
exemption be $10000, and let the statutory marginal rate thereafter be 50%. Someone earning
$50000 pays the levy of $20000, on average 40%. Let all incomes grow 5%, and exemption be
indexed on national income. Then exemption becomes $10500, income $52500, tax $21000, again
40%. Thus on the (dynamic) "marginal dollar" this person doesn't pay 50% but 40%.
Since the present situation is inefficient, an improvement is possible from which everybody can
benefit, i.e. a Pareto improvement. There are various ways to improve the present situation. A clear
example is the following. Exemption has a natural position at subsistence, witness the 1889 anal-
ogy by Cohen Stuart (see Hofstra (1975)) that a bridge must hold its own weight before it can carry
a load. If exemption were to be put at subsistence, then jobs could be created at the low end of the
labour market, which saves benefits and reduces average taxes, which increases incentives. If a
larger part of labour supply is eligible on the job market, then wage claims already will be reduced
by standard analysis. In addition, this paper suggests that if low productivity labour has a stronger
position in the labour market, then the risk of unemployment is spread more evenly, and (trend
setting) higher productivity labour will be even more cautious with inflationary wage claims.
18 SOLUNEMP.nb
References
Ashenfelter & Layard eds. (1986), "Handbook of labour economics", North Holland
Aronson (1992a), "The Social Animal", Freeman
Aronson ed. (1992b), "Readings about The Social Animal", Freeman
Auerbach & Kotlikoff (1987), "Dynamic fiscal policy", Cambridge
Blanchard & Fischer (1989), "Macroeconomic Lectures", MITl
Beenstock and associates (1987), "Work, welfare and taxation", Allen & Unwin
Den Broeder (1989), "Alternatieve heffingsgrondslagen voor de sociale zekerheid, Micro-, meso-
en macro-economische effecten", Magnana Mu Publishing & Research, & No 17 Commissie Onder-
zoek Sociale Zekerheid, Ministerie van Sociale Zaken en Werkgelegenheid
Bruno & Sachs (1985), "Economics of worldwide stagflation", Blackwell
Cool (1990), "Opmerkingen over de loonvergelijking in lange termijn perspectief", CPB internal
note III-5
Cool (1991), "Eenvoud niet alleen via prioriteitsstelling", CPB internal note III-15
Cool (1992), "Definition and Reality in the general theory of political economy; Some background
papers 1989-1992", Magnana Mu Publishing & Research, Rotterdam (Dutch & English)
Centraal Planbureau (1992a), "Scanning the future", SDU
Centraal Planbureau (1992b), "Nederland in drievoud", SDU (Dutch)
The Economist (1991), April 27th, p45-46
The Economist (1993), "Economic focus: indirect taxes", 4th December
The Economist (1994), "Schools Brief", Februari 19th and 26th, "Getting back to full employ-
ment", March 5th.
Friedman (1991), "Monetarist economics", Blackwell
Gelauff (1992), "Taxation, social security and the labour market", Thesis Katholieke Universiteit
Tilburg
Hofstra (1975), "Inkomstenbelasting", Kluwer
Hum & Simpson (1991), "Income maintenance, work effort, and the Canadian Mincome Experi-
ment", A study prepared for the Economic Council of Canada
Layard, Nickell & Jackman (1991), "Unemployment", Oxford
Minford & Ashton (1993), "The poverty trap and the Laffer curve: What can the GHS tell us?", in
Knoester, "Taxation in the United States and Europe", St. Martin's press
OECD (1986), "An empirical analysis of changes in personal income taxes", Paris
Okun (1981), "Prices & Quantities", Blackwell
Phelps (1994), "Structural slumps: The modern equilibrium theory of unemployment, interest and
assets", Harvard UP
Wolfram (1992), "Mathematica", Addison-Wesley
SOLUNEMP.nb 19
Appendix A: Definitions, densities and the Phillipscurve
This appendix gives some elements for heterogeneous labour markets. The following accounting
definitions are useful:
product= labour costs + profit
labour costs = wage costs + nonwage but labour related costs
= net income + (direct + indirect) taxes + premia + other nonwage costs
gross income = labour costs - other nonwage costs = net income + levy
Neglecting the "other nonwage costs" gives y = gross income = labour costs. Observed labour costs
have a frequency density f[y]. Since the product is yp = y (1 + profitrate), equalisation of profitrates
produces f[y] as a shift of the productivity density fp[yp].
The labour supply density depends on net income (y - l[y]) but can under mentioned assumptions
be regarded as a function of labour cost y, as s[y] = s*[y - l[y, q]]. Total supply S follows from the
integral from some minimum ms till infinity.
(A1) S[ms] = Integrate[ s[y], {y, ms, Infinity} ] (almost fixed)
Labour demand has density d[y] and an integral from some minimum md till infinity.
(A2) D[md] = Integrate[ d[y], {y, md, Infinity} ]
The employment density under mentioned assumptions then is:
(A3) e[y] = Min[s[y], d[y]] = f[y]
Unemployment u and vacancies v follow from the difference between supply and demand and
actual employment.
(A4) u[y] = s[y] - e[y]
(A5) v[y] = d[y] - e[y]
Price inflation p in each market depends upon the power position of employers and employees,
which is determined, amongst others, by the relative situation of unemployment versus vacancies.
The relationship between inflation and the other variables clearly is a dynamic one. We thus read all
variables as time dependent. We also add the price expectations p*, history of the variables, and
add the levy burden for forward shifting:
20 SOLUNEMP.nb
(A6) p[y] = p[ p*[y], u[y], v[y], l[y] / y, history ]
The NAI-u arises as the solution of a stable u* for zero price acceleration.
The submarkets Phillipscurve in (A6) is not entirely satisfactory since it doesn't mention the influ-
ence of other submarkets. A macro-economic hypothesis is that the development within markets is
not merely influenced but even dominated by general events.
For total employment we take account of a minimum wage m. We then take the integral from
Max[ms, md, m] till infinity.
(A3a) E[ms, md, m] = Integrate[ f[y], {y, Max[ms, md, m], Infinity} ]
(A4a) U = (S - E) / S = U[ms, md, m] (a rate)
(A5a) V = (D - E) / S = V[ms, md, m] (a rate)
Minimum wage m typically dominates both ms and md. Would-be earners of ms < y < m become
eligible for benefits. When they accept these voluntarily or from social pressure, they, in a sense,
form no real supply. Yet they are supply, otherwise they would not be eligible. On the demand side,
there would be a real demand for md < y < m if government would reduce m. But this demand is not
relevant when m exists.
Denote mx = Max[m, md]. The situation that ms < mx causes two kinds of unemployment. The first
part consists of the supply in the [ms, mx) range that is always unemployed, and the other is the
more normal part.
(A7) U = Um + Un
(A7a) Um = Integrate[ s[y], {y, ms, < mx} ] / S = Um[ms, mx]
(A7b) Un = 1 - Um - E / S = Un[mx]
If ms < mx then only Un will exert a meaningful pressure on wage demand. A major dynamic pro-
cess is that Um rises over time, contributing to the phenomenon of hysteresis. The Phillipscurve
might stay stable in terms of Un, "normal" unemployment rate, but shifts in terms of U, the overall
unemployment rate.
SOLUNEMP.nb 21
Appendix B: Alternative levy
General
We take up the argument at equations (17) till (22), determine constraints on new parameters q*,
and try to solve for a plot of x* and L*/Y*. The key variable is m*, which determines new employ-
ment, national income and savings on benefits.
Since (19) must hold for all y, then also as y goes to infinity. Hence r* =< r. Taking the highest value
r, and then eliminating it:
(B1) r* = r
(19a) (y - x*) / (y + c*) =< (y - x) / (y + c)
(19b) 1 - (x* + c*) / (y + c*) =< 1 - (c + x) / (y + c)
(19c) x* >= (c + x) (y + c*) / (y + c) - c*
The latter must hold for all y in the relevant range [m, infinity). Since (c* =< c) then the smallest
value of the part ((y + c*) / (y + c)) in the relevant range is ((m + c*) / (m + c)) and the greatest is the
limit 1. Since x* must be larger than the greatest value:
(19d) x* >= (c + x) - c* >= x (c* =< c)
In addition, we can find a relation for x* by working out (18):
(18a) x* = m* + (b / m* - 1)/r (m* + c*) (m* =< b)
Substitution of (18a) in (19d) using B = (b / m* - 1) / r = B[m*] >= 0 gives:
(B2) x* = m* + B (m* + c*) >= (c + x) - c*
(B2a) c* >= (c + x) / (1 + B) - m* = c*[m*]
The choice of m* thus defines certain ranges for c* and x*.
Levy revenue L* is an integral. Setting revenue equal to expenditure L* = L - b dE[m*] gives a
restriction on q* too. Selecting various values of m* allows a plot of x* and L*/Y*.
22 SOLUNEMP.nb
Linear
A specific alternative would be the linear levy, with c* = 0. Linearity allows the transformation of the
intersection into a "levy credit" k = r x*. With r y as the ray through the origin that gives levies in the
limit, the linear alternative is a parallel line, shifted k points along the axis. A linear function allows a
quick determination of levy revenue:
(B3) l*[y] = r (y - x*) = r y - k
(B3a) L* = r Y* - k E*
(18b) r x* = k = b - (1 - r) m* or x* = b/r - (1/r - 1) m*
This allows easy analytical expressions for x* and L*/Y*. The linear case however may have few
solutions. If the original regime is very nonlinear (c >> 0) then this linear alternative is costly and
may not exist. By diligent substitution:
(B3b) L - b dE[m*] = r (Y + w[m*] dE[m*]) - (b - (1 - r) m*) (E + dE[m*])
(B3c) L - r Y - r w[m*] dE[m*] + E b = m* (1 - r) (E + dE[m*])
Divide by E and use employment growth rate g[m*] = dE[m*] / E. Denote x" = (Y - L/r) / E. This x" is
defined on known variables and gives some implied intersection. Likely x" > 0. Substitute (18b) in
(B3c)
(B4) m* = ( b - r x" - r w[m*] g[m*] ) / { (1 - r) (1 + g[m*]) }
For completeness only, expand L*/Y*:
(B3d) L* / Y* = r (1 - x* E* / Y*) = r (1 - x* (E + dE[m*]) / (Y + w[m*] dE[m*]))
Note that substituting c* = 0 and (18b) in (19d) gives a condition on m*:
(B2a') b/r - (1/r - 1) m* >= (c + x) => m* =< (b - r (c + x)) / (1 - r)
For the solution set of m* in (B4) and (B2a'), x*[m*] follows from (18b) and then L*/Y* from (B3d).
This provides a plot of L*/Y* against x*.
SOLUNEMP.nb 23
Combining (B4) and (B2a'), writing g = g[m*] and w = w[m*], gives the condition:
(B5) m* = ( b - r x" - r w g) / { (1 - r) (1 + g) } =< (b - r (c + x)) / (1 - r)
(B5a) x" >= (1 + g) (c + x) - w g - b g / r
(B5b) w >= { (1 + g)(c + x) - b g / r - x" } / g
Which is a restatement of the fact that if the original function is very nonlinear (high c), then the
linear NIL is not likely to be feasible.
To proceed, we can fill in macro data, and use the estimated levy parameters.The estimates on
page 5 exclude social premiums, and thus underestimate the room for improvement.
For Holland, Y = $294 bn, L = $155 bn, E = 5 mln. Then x" = $4319. The new intersection would be
at x* = c + x = 20228, which is rather high.
Ad (B5a): A test using (B5a) could assume full employment. Let m* be put at zero, so that every-
body with a productivity between 0 and m could find a job. For Holland g[0] ~ U = 10 %. Denote
potential average earnings in this U-group as w[0] = h b. Then (B5a) solves into h >= 14.5. This
means that average earnings in the U-group must be at least 14.5 times the benefit level. This is
not realistic.
Ad (B5b): When w and g are not given, assume equality in (B5b), and find w = 15908 / g + 997. It
follows that employment growth g must be large (say 30 %) before reasonable values are found for
the potential average earnings applicable for the present unemployed.
Both results mean that it is not feasible in Holland to achieve full employment by replacing the
existing regime with a linear NIL that specifically respects all individual average levy burdens. A
nonlinear relation remains needed. Of course, this conclusion rests upon the parameter estimate
that still excludes social premiums.
Partial linear
Another alternative is partial linearisation. Chose an arbitrary income y*, for example actual maxi-
mum income. The marginal rate or tangent at that point is given by (3), say r*. This tangent inter-
sects the horizontal axis at x* = y* - l[y*] / r*. Thus a partly linear levy regime would be:
(B5) l*[y] = r* (y - y*) + l[y*] (y =< y*)
l*[y] = l[y] (y >= y*)
The advantage of a (partly) linear scheme is that it allows a quicker recovery of the NIL, but it also
tends to result into higher losses in the higher income section. So a nonlinear scheme might still be
best.
24 SOLUNEMP.nb